Precoding codebooks for 4tx and 8tx mimo communication systems

ABSTRACT

A method for communication includes configuring a communication system that includes a transmitter and a receiver with first precoding matrices for mapping up to N data streams onto N transmit antenna ports of the transmitter. Each of at least some of the first precoding matrices are derived from respective second and third precoding matrices. The second and third precoding matrices are configured for mapping data onto respective numbers of transmit antenna ports that are less than N. The data streams are mapped onto the N transmit antenna ports using a precoding scheme based on one of the first precoding matrices. The mapped data streams are transmitted over the N transmit antenna ports from the transmitter to the receiver.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application is a continuation of U.S. patent application Ser. No. 13/760,088, filed Feb. 6, 2013, which is a continuation of U.S. patent application Ser. No. 12/652,044, filed Jan. 5, 2010, which claims the benefit of U.S. Provisional Patent Application 61/142,507, filed Jan. 5, 2009. The disclosures of these related applications are incorporated herein by reference.

FIELD OF THE DISCLOSURE

The present disclosure relates generally to communication systems, and particularly to methods and systems for communication using multiple antennas.

BACKGROUND

Some communication systems transmit data from a transmitter to a receiver over multiple communication channels, using multiple transmit antennas and multiple receive antennas. Multiple-channel transmission is used, for example, in spatial multiplexing schemes that achieve high throughput, in beam-forming schemes that achieve high antenna directivity and in spatial diversity schemes that achieve high resilience against channel fading and multipath. These schemes are often referred to collectively as Multiple-Input Multiple-Output (MIMO) schemes.

MIMO schemes are contemplated, for example, for use in Evolved Universal Terrestrial Radio Access (E-UTRA) systems, also referred to as Long Term Evolution (LTE) systems. The Third Generation Partnership Project (3GPP) E-UTRA standards specify MIMO schemes for use by E-UTRA User Equipment (UE) and base stations (eNodeB). These schemes are described, for example, in 3GPP Technical Specification 36.211, entitled “Technical Specification Group Radio Access Network; Evolved Universal Terrestrial Radio Access (E-UTRA); Physical Channels and Modulation (Release 8),” (3GPP TS 36.211), version 8.6.0, March, 2009, which is incorporated herein by reference. In particular, section 6.3.4 of this specification defines precoding schemes that map data streams (also referred to as spatial layers) onto up to four transmit antenna ports. The 3GPP is currently in the process of specifying an extension of the E-UTRA specification, which is referred to as LTE-Advanced (LTE-A). The evolving LTE specifications contemplate the use of up to eight transmit antenna ports.

The description above is presented as a general overview of related art in this field and should not be construed as an admission that any of the information it contains constitutes prior art against the present patent application.

SUMMARY

An embodiment that is described herein provides a method for communication. The method includes configuring a communication system, which includes a transmitter and a receiver, with first precoding matrices for mapping up to N data streams onto N transmit antenna ports of the transmitter. Each of at least some of the first precoding matrices are derived from respective second and third precoding matrices. The second and third precoding matrices are configured for mapping data onto respective numbers of transmit antenna ports that are less than N. The data streams are mapped onto the N transmit antenna ports using a precoding scheme based on one of the first precoding matrices. The mapped data streams are transmitted over the N transmit antenna ports from the transmitter to the receiver.

In some embodiments, configuring the communication system includes producing a given first precoding matrix by computing a Kronecker product between a respective second precoding matrix, selected from among the second precoding matrices and a respective third precoding matrix selected from among the third precoding matrices.

In an embodiment, the first precoding matrices map R1 data streams onto the N antenna ports, R1≦N, and configuring the communication system includes defining a set of the precoding matrices for mapping r data streams onto the N transmit antenna ports, r<R1, each precoding matrix in the set including a subset of columns of a given matrix selected from the first precoding matrices. In a disclosed embodiment, defining the set includes including a candidate precoding matrix in the set responsively to verifying that the candidate precoding matrix cannot be expressed as a weighted permutation of the columns of another precoding matrix in the set. In an embodiment, a candidate precoding matrix is included in the set responsively to verifying that respective distances between the candidate precoding matrix and the other precoding matrices in the set, measured in accordance with a given distance metric, exceed a given threshold. In another embodiment, defining the set includes selecting the precoding matrices in the set to match a geometrical configuration of transmit antennas of the transmitter. In an embodiment, selecting the precoding matrices in the set includes choosing the precoding matrices in the set to match an array of cross-polarized transmit antennas. In yet another embodiment, mapping the data streams includes mapping the r data streams onto the N transmit antenna ports using one of the precoding matrices in the set.

In yet another embodiment, configuring the communication system includes storing in the communication system only the second and third precoding matrices, and computing the one of the first precoding matrices in the transmitter based on the stored second and third precoding matrices. In still another embodiment, transmitting the mapped data streams includes transmitting a signal conforming to a Long Term Evolution Advanced (LTE-A) specification. In an embodiment, mapping the data streams includes selecting the precoding scheme based on feedback from the receiver. In a disclosed embodiment, N=8. In an embodiment, the second precoding matrices are defined for mapping onto two antenna ports, and the third precoding matrices are defined for mapping onto four antenna ports. In an alternative embodiment, the second precoding matrices are defined for mapping onto four antenna ports, and the third precoding matrices are defined for mapping onto two antenna ports.

There is additionally provided, in accordance with an embodiment that is described herein, a communication apparatus that includes N transmit antenna ports and a transmitter. The transmitter is configured to accept a definition of first precoding matrices for mapping up to N data streams onto N transmit antenna ports, each of at least some of the first precoding matrices derived from respective second and third precoding matrices configured for mapping data onto respective numbers of transmit antenna ports that are less than N, to map the data streams onto the N transmit antenna ports using a precoding scheme based on one of the first precoding matrices, and to transmit the mapped data streams over the N transmit antenna ports to a receiver.

There is also provided, in accordance with an embodiment that is described herein, a mobile communication terminal that includes the disclosed communication apparatus. There is further provided, in accordance with an embodiment that is described herein, a chipset for processing signals in a mobile communication terminal, including the disclosed communication apparatus.

The present disclosure will be more fully understood from the following detailed description of the embodiments thereof, taken together with the drawings in which:

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a block diagram that schematically illustrates a transmitter having multiple antennas, in accordance with an embodiment of the present disclosure;

FIG. 2 is a diagram showing a precoding matrix defined as a Kronecker product between two lower-dimension precoding matrices, in accordance with an embodiment of the present disclosure;

FIG. 3 is a flow chart that schematically illustrates a method for generating precoding codebooks for eight transmit antenna ports using precoding matrices defined for two and four transmit antenna ports, in accordance with an embodiment of the present disclosure; and

FIG. 4 is a flow chart that schematically illustrates a method for precoding in a transmitter having eight antenna ports using precoding matrices defined for two and four transmit antenna ports, in accordance with an embodiment of the present disclosure.

DETAILED DESCRIPTION OF EMBODIMENTS

In some MIMO schemes, a transmitter maps streams of modulated symbols onto spatial layers, i.e., signals that are to be transmitted over different MIMO transmission channels. The spatial layers are also referred to as transmission layers or spatial streams, or simply data streams for brevity. The transmitter then applies a precoding operation to map each spatial layer onto a respective set of antenna ports. The precoding operation is typically expressed by a precoding matrix, which defines the linear combination of spatial layers that is mapped onto each antenna port. Some MIMO systems use a predefined set of precoding matrices, referred to as a codebook, which is known to the transmitter and the receiver. A transmission process of this sort, as performed in the downlink of an E-UTRA eNodeB, is described in detail in section 6.3 of the 3GPP TS 36.211 specification, cited above. The description below follows the convention used in this 3GPP specification, in which the precoding is specified by a matrix whose number of rows is equal to the number of antenna ports, and whose number of columns is equal to the number of spatial streams.

Embodiments that are described herein provide improved methods and systems for precoding in MIMO systems. The disclosed techniques configure a communication system that includes a transmitter and a receiver with a set of precoding matrices for mapping up to N data streams onto N transmit antenna ports. This set of precoding matrices is derived from sets of precoding matrices that are defined for numbers of transmit antenna ports smaller than N. For example, the disclosed methods can be used to generate a codebook for eight transmit antenna ports from a codebook defined for two antenna ports and a codebook defined for four antenna ports.

In some embodiments, a given precoding matrix is produced by computing a Kronecker product (also known as a direct product or a tensor product) between matrices selected from the codebooks defined for the smaller numbers of antenna ports. This technique produces codebooks whose precoding matrices have a number of desirable properties, which are described in detail below. Several techniques for generating sub-codebooks (SCBs) for mapping different numbers of data streams onto the N antenna ports are also described.

The disclosed techniques produce high-performance precoding matrices with relatively small computational complexity. In addition, these methods and systems provide straightforward backward compatibility to smaller numbers of antenna ports. In some embodiments, the codebook is computed in advance and provided to the transmitter. In alternative embodiments, the transmitter stores only the precoding matrices defined for the smaller numbers of antenna ports, and computes precoding matrices for N antenna ports as needed. As a result, memory requirements in the transmitter can be reduced considerably. The embodiments described herein refer mainly to LTE-A systems, but the disclosed techniques are applicable to any other suitable MIMO system.

FIG. 1 is a block diagram that schematically illustrates a transmitter 20 having multiple antennas, in accordance with an embodiment of the present disclosure. The description that follows refers to a transmitter of an LTE-A eNodeB, although other transmitters are contemplated. In alternative embodiments, for example, the methods and systems described herein can be used in transmitters operating in accordance with any other suitable communication standard or protocol, such as IEEE 802.16 (also referred to as WiMAX), for example. Although the description that follows refers mainly to downlink transmission from the eNodeB to the UE, the disclosed methods and systems may be applicable to uplink transmission, as well.

Transmitter 20 comprises one or more modulation chains, each comprising an Error Correction Code (ECC) encoder 24, a scrambler 28 and a modulation mapper 32. Data for transmission is encoded by ECC encoders 24, to produce respective ECC code words. (The example of FIG. 1 shows two separate ECC encoders for clarity. In practice, however, the transmitter may comprise a single ECC encoder that produces code words for the different modulation chains.)

The bits of each code word are scrambled by a respective scrambler 28, and then modulated by a respective modulation mapper 32. Each modulation mapper produces a stream of complex-valued modulated symbols. Any suitable modulation scheme, such as Quadrature Phase Shift Keying (QPSK) or Quadrature Amplitude Modulation (QAM), can be used. A given modulation mapper 32 typically operates on the scrambled bits of a given code word to produce a block of complex-valued modulated symbols.

A layer mapper 36 maps the modulated symbol streams produced by modulation mappers 32 onto one or more spatial layers. (For a given set of time and frequency resources allocated to a certain communication channel, the multiple transmit and receive antennas add another “spatial” dimension to those resources. One of the possibilities to exploit the additional spatial dimension is by increasing the number of independent modulated symbols transmitted per time-frequency resource. The factor of increase, relative to the case of a single transmit antenna and a single receive antenna, is defined as the number of spatial layers.) The spatial layers are also referred to herein as data streams.

The actual number of spatial layers (also referred to as the transmission rank) used by mapper 36 is typically a selectable parameter. The choice of this value may depend, for example, on the channel conditions between transmitter 20 and a given receiver (not shown) to which the transmission is intended. Each spatial layer comprises a stream of complex values, which are to be subsequently transmitted over the MIMO communication channel.

The mapped spatial layers are provided to a precoder 40. Precoder 40 maps the spatial layers onto N Tx transmission channels, corresponding to N Tx antenna ports 52 of the transmitter. In the present example, transmitter 20 comprises an LTE-A transmitter having eight Tx antenna ports, i.e., N=8. (Note that a given antenna port may not necessarily correspond to a single physical antenna, but may correspond to a “virtual antenna” whose transmitted signal is generated—in a manner that the receiver need not necessarily be aware of—as a superposition (a weighted sum) of the signals stemming from a number of physical antennas. Note also that the number of antenna ports may be larger than the number of layers.) Resource mappers 44 allocate resource elements (time-frequency allocations) to the respective transmission channels. The outputs of mappers 44 are processed in the present example by respective Orthogonal Frequency Division Multiplexing (OFDM) generators 48, which produce OFDM signals that are transmitted via antenna ports 52 toward the receiver.

Transmitter 20 comprises a controller 56, which configures and controls the different transmitter elements. In particular, controller 56 comprises precoding control module 60, which produces precoding matrices for use by precoder 40. In a typical implementation, module 60 selects a precoding matrix that matches the current channel conditions between the transmitter and the receiver, and configures precoder 40 with the selected precoding matrix. In particular, the number of columns of the precoding matrix determines the transmission rank (i.e., the actual number of spatial layers). This rank is denoted by r, wherein r≦N. (Typically, the rank is also constrained to be smaller than or equal to the number of receiving antennas at the receiver.)

As noted above, transmitter 20 in the present example comprises eight Tx antenna ports 52. Thus, the precoding matrices used by module 60 for a given rank are 8-by-r matrices. These matrices are referred to herein as 8Tx precoding matrices, for the sake of brevity. In some embodiments, the precoding matrices are selected from a codebook, i.e., from a predefined set of matrices that are agreed upon between the transmitter and receiver. In an embodiment, the transmitter receives from the receiver feedback, which is indicative of the preferable precoding matrix in the codebook. Module 60 may select the appropriate matrix from the codebook based on this feedback. Module 60 may configure precoder 40 with the matrix requested by the receiver as-is, or it may apply additional considerations in selecting the precoding scheme to be used by the transmitter.

In some embodiments, the 8Tx precoding matrices used by module 60 are derived from lower-dimension precoding matrices, in the present example from 2Tx and 4Tx precoding matrices (i.e., from precoding matrices defined for two and four Tx antenna ports, respectively). Several methods for deriving 8Tx precoding matrices from 2Tx and 4Tx precoding matrices are described in detail below.

In some embodiments, the codebook of 8Tx precoding matrices is computed in advance and stored in the transmitter. In alternative embodiments, only the 2Tx and 4Tx precoding matrices are stored in the transmitter, and module 60 computes the 8Tx precoding matrices from these matrices as required. In these embodiments, transmitter 20 comprises a memory 64, which holds the lower-dimension codebooks. In the present example, memory 64 holds a 2Tx codebook 68 defined for two Tx antenna ports and a 4Tx codebook 72 defined for four Tx antenna ports. Module 60 computes precoding matrices for eight antenna ports based on lower-dimension matrices selected from codebooks 68 and 72. The functions of module 60 are explained in detail below.

The transmitter configuration shown in FIG. 1 is a simplified example configuration, which is depicted for the sake of conceptual clarity. In alternative embodiments, any other suitable transmitter configuration can also be used. For example, although the embodiments described herein refer mainly to transmitters having N=8 transmit antenna ports, the methods and systems described herein can be used with any other suitable number of antenna ports. Typically, the number of antenna ports is not a prime number. The lower-dimension codebooks from which the NTx precoding matrices are derived may have any other suitable dimensions smaller than N. In some embodiments, transmitter 20 is part of a base station (e.g., LTE-A eNodeB), and the precoding schemes described herein are applied in the downlink channel. In alternative embodiments, transmitter 20 is part of a mobile terminal (e.g., LTE-A UE), and the precoding schemes described herein are applied in the uplink channel.

The different components of transmitter 20 may be implemented using dedicated hardware, such as using one or more Application-Specific Integrated Circuits (ASICs) and/or Field-Programmable Gate Arrays (FPGAs). Alternatively, some transmitter components may be implemented using software running on general-purpose hardware, or using a combination of hardware and software elements. Typically, controller 56 comprises a general-purpose processor, which is programmed in software to carry out the functions described herein, although it too may be implemented on dedicated hardware. The software may be downloaded to the processor in electronic form, over a network, for example, or it may, alternatively or additionally, be provided and/or stored on tangible media, such as magnetic, optical, or electronic memory. In some embodiments, some or all of the elements of transmitter 20 may be fabricated in a chip-set. Transmitter elements that are not mandatory for explanation of the disclosed techniques, such as various Radio Frequency (RF) elements, have been omitted from FIG. 1 for the sake of clarity.

Embodiments of the present disclosure provide methods and systems suitable for designing and applying precoding codebooks. The disclosed techniques generate codebooks of NTx precoding matrices from codebooks that are defined for smaller numbers of Tx antenna ports. The embodiments described below produce 8Tx codebooks from 2Tx and 4Tx codebooks, however these techniques can be adapted to any other dimensions in a straightforward manner. As noted above, the NTx precoding matrices may be produced a-priori using the disclosed techniques and provided to module 60, or they can be computed by module 60 when needed.

The description that follows uses the following notation: A codebook defined for N_(T) Tx antenna ports is denoted CB^((N) ^(T) ⁾. Codebook CB^((N) ^(T) ⁾ comprises multiple sub-codebooks (SCBs), each SCB defined for a given rank r (i.e., a given number of spatial layers to be precoded onto the K Tx antenna ports), r≦K. The SCB for a given rank r is denoted CB_(r) ^((N) ^(T) ⁾In the case of eight Tx antenna ports, codebook CB⁽⁸⁾ is thus given by

${CB}^{(8)} = {\overset{8}{\bigcup\limits_{r = 1}}{{CB}_{r}^{(8)}.}}$

When designing a codebook of precoding matrices, it is often desirable for the matrices in the codebook to meet certain design guidelines. Example guidelines are described in “Codebook Based Precoding for 8 TX Transmission in LTE-A,” 3GPP TSG RAN WG1 document R1-084172, Prague, Czech Republic, Nov. 10-14, 2008, which is incorporated herein by reference. These guidelines define several desirable properties of the codebook, namely unitarity, nestedness, constant modulus and constrained alphabet.

The Unitarity property means that the precoding matrices in the full-rank SCB are unitary, up to a scalar factor. The nestedness property means that for any r<N_(T), the columns of every precoding matrix in CB_(r) ^((N) ^(T) ⁾ are proportional (up to a column-dependent scaling) to r columns of a certain precoding matrix in the full-rank SCB CB_(N) _(T) ^((N) ^(T) ⁾. A stronger nestedness requirement imposes that for any r<N_(T), the columns of every precoding matrix in CB_(r) ^((N) ^(T) ⁾ are proportional (up to a column-dependent scaling) to r columns of a certain precoding matrix in the next-higher-rank SCB CB_(r+1) ^((N) ^(T) ⁾.

The nestedness property enables reducing the complexity of computations at the receiver when computing the preferred precoding for several ranks (where the precoding options are restricted to belong to the codebook CB^((N) ^(T) ⁾, as well as fallback to lower ranks using rank adaptation.

The constant modulus property means that all the matrix element in a given precoding matrix are of equal absolute value. The constrained alphabet property means that the matrix elements in the different precoding matrices are restricted to a simple finite alphabet. One possible alphabet is the 8-PSK alphabet, given by

$\begin{matrix} \begin{matrix} {\forall{W \in {CB}_{r}^{(N_{T})}}} & {\left( {{r = 1},2,\ldots \mspace{14mu},N_{T}} \right),} \\ {{{\forall s} = 1},2,\ldots \mspace{14mu},r,} & {{{\forall t} = 1},2,\ldots \mspace{14mu},N_{T},} \\ {{W_{ts} = \frac{^{j\; 2\; \pi \; {\alpha_{ts}/8}}}{\sqrt{{rN}_{T}}}},} & {{\alpha_{ts} = 0},1,\ldots \mspace{14mu},7} \end{matrix} & {{Equation}\mspace{14mu} 1} \end{matrix}$

In other words, the 8-PSK alphabet is given by:

$\begin{matrix} {{\sqrt{{rN}_{T}}W_{ts}} \in \left\{ {{\pm 1},{\pm {j.\frac{{\pm 1} \pm j}{\sqrt{2}}}}} \right\}} & {{Equation}\mspace{14mu} 2} \end{matrix}$

An alternative constrained alphabet is the QPSK alphabet, in which each precoding matrix element is restricted to the set {±1,±j} (up to an overall normalization constant). The use of constrained alphabets simplifies the computations and reduces memory requirements associated with precoding at the transmitter, as well as feedback computations and decoding at the receiver.

In some embodiments, each precoding) matrix in the full-rank SCB CB₈ ⁽⁸⁾ is defined as a Kronecker product between a precoding matrix in CB₂ ⁽²⁾ and a precoding matrix in CB₄ ⁽⁴⁾. Thus:

$\begin{matrix} \begin{matrix} {{CB}_{8}^{(8)} \subseteq \left\{ {{W^{(2)} \otimes W^{(4)}}{W^{(n)} \in {CB}_{n}^{(n)}}} \right\}} \\ {\bigcup\left\{ {{W^{(4)} \otimes W^{(2)}}{W^{(n)} \in {CB}_{n}^{(n)}}} \right\}} \end{matrix} & {{Equation}\mspace{14mu} 3} \end{matrix}$

wherein W⁽²⁾ and W⁽⁴⁾ denote precoding matrices drawn from CB₂ ⁽²⁾ and CB₄ ⁽⁴⁾, respectively, and {circle around (×)}denotes a Kronecker product (also referred to as a direct product or a tensor product).

Given an m-by-n matrix A and a p-by-q matrix B, the Kronecker product of these matrices, denoted C=A{circle around (×)}B, is an m·p-by-·q matrix whose elements are defined by c_(αβ)=a_(ij)b_(kl), wherein α≡p(i−l)+k and β=q(j−l)+l. When A comprises a 2-by-2 matrix, for example, A{circle around (×)}B is a block matrix having the form:

$\begin{matrix} {{A \otimes B} = \begin{bmatrix} {a_{11}B} & {a_{12}B} \\ {a_{21}B} & {a_{22}B} \end{bmatrix}} & {{Equation}\mspace{14mu} 4} \end{matrix}$

FIG. 2 is a diagram showing a precoding matrix defined as a Kronecker product between two lower-dimension precoding matrices, in accordance with an embodiment of the present disclosure. In the example of FIG. 2, A is an n-by-n precoding matrix drawn from the full-rank CB_(n) ^((n)) SCB, and B is a p-by-p precoding matrix drawn from the full-rank CB_(p) ^((p)) SCB. The Kronecker product A{circle around (×)}B produces an n·p-by-n·p precoding matrix that can be used as part of a full-rank CB_(np) ^((np)) SCB.

From Equation 1 above and the definition of the Kronecker product, it implies that:

∀WεCB₈ ⁽⁸⁾,∃W⁽²⁾εCB₂ ⁽²⁾&∃A⁽⁴⁾εCB₄ ⁽⁴⁾  Equation 5:

such that:

W_(ts)=W_(t) ₁ _(s) ₁ ⁽²⁾W_(t) ₂ _(s) ₂ ⁽⁴⁾ for t₁,s₁=1,2,t₂,s₂=1,2,3,4  Equation 6:

with either t=4(t₁−1)+t₂, s=4(s₁−1)+s₂, or t=2(t₂−1)+t₁, s=2(s₂−1)+s₁.

Thus, Equation 3 above defines each precoding matrix in the full-rank SCB CB₈ ⁽⁸⁾ as a Kronecker product between a precoding matrix from CB₂ ⁽²⁾ and a precoding matrix from CB₄ ⁽⁴⁾. This full-rank SCB can be used by transmitter 20 to precode eight spatial layers (data streams) onto the eight Tx antenna ports. As can be appreciated, if both CB₂ ⁽²⁾ and CB₄ ⁽⁴⁾ meet the unitarity, constant modulus and constrained alphabet guidelines described above, then this construction automatically guarantees that the full-rank SCB CB₈ ⁽⁸⁾ meets these guidelines, as well.

In some embodiments, the lower-rank SCB CB_(r) ⁽⁸⁾ is derived from the full-rank SCB CB₈ ⁽⁸⁾ in order to precode r<8 layers onto the eight Tx antenna ports of transmitter 20. In an example process, 8−r out of the eight columns of a given matrix in CB₈ ⁽⁸⁾ are deleted, to produce an 8-by-r matrix. The matrix is then multiplied by √{square root over (8/r)}. The resulting matrix can be used as a candidate for inclusion in CB_(r) ⁽⁸⁾. This process meets the less-restrictive nestedness property defined above (in which the columns of every precoding matrix in CB_(r) ^((N) ^(T) ⁾ are proportional (up to a column-dependent scaling) to r columns of a certain precoding matrix in the full-rank SCB CB_(N) _(T) ^((N) ^(T) ⁾).

In another example embodiment, one of the columns in a given matrix in CB_(r+1) ⁽⁸⁾ is deleted, to produce an 8-by-r matrix. The matrix is then multiplied by √{square root over ((r+1)/r)}. The resulting matrix can be used as a candidate for inclusion in CB₈ ⁽⁸⁾. This process meets the more-restrictive nestedness property defined above (in which the columns of every precoding matrix in CB_(r) ^((N) ^(T) ⁾ are proportional (up to a column-dependent scaling) to r of the columns of a certain precoding matrix in CB_(r+1) ^((N) ^(T) ⁾.

When constructing a given SCB, it is typically desirable to avoid including candidate precoding matrices that are effectively equivalent. Two candidate precoding matrices are considered equivalent if they are identical up to a permutation of rows and/or columns, and/or overall or column-dependent scaling. For example, the matrices

${M\; 1} = {\frac{1}{2}\begin{bmatrix} j & 1 \\ 1 & j \end{bmatrix}}$ and ${M\; 2} = {\frac{1}{2}\begin{bmatrix} 1 & 1 \\ j & {- j} \end{bmatrix}}$

are equivalent to one another, since M2 can be produced from M1 by swapping the columns of M1 and then multiplying the second column by −j. Equivalent precoding matrices merely permute the spatial streams and possibly rotate the modulated symbols in the streams before they are mapped onto the antenna ports. Thus, in some embodiments, a lower-rank SCB CB_(r) ⁽⁸⁾ can be produced from the full-rank SCB CB₈ ⁽⁸⁾ by generating candidate precoding matrices, and removing matrices that are equivalent.

In some embodiments, once a given SCB CB_(r) ⁽⁸⁾ is produced, one or more of the precoding matrices in the SCB can be deleted in order to reduce the SCB size. This operation is also referred to as diluting (or trimming) the SCBs. Any suitable criteria can be used for diluting the SCBs. For example, the SCBs can be diluted in a manner that best reduces the amount of feedback from the receiver to the transmitter (e.g., the number of bits used for indicating the preferable precoding matrix to the transmitter). In accordance with an embodiment, although not necessarily, the number of matrices in each SCB is set to integer powers of two, so that the utilization of bits in the feedback messages will be optimal. In another example embodiment, a given SCB is reduced in a manner that improves system performance (e.g., average link throughput). The identities of the precoding matrices that best (or worst) contribute to the desired performance can be determined, for example, by attempting to best cover the space of all (unitary) matrices of the relevant dimension. In one embodiment, the SCB can be diluted so as to maximize the minimum distance (with respect to a certain metric, e.g., a chordal metric) among all pairs of matrices in the SCB. For example, a dilution criterion may specify that the distances between precoding matrices in the SCB should exceed a given threshold. In alternative embodiments, the dilution criterion may depend on the communication system performance, as estimated from link-level or system-level simulation. This evaluation may depend on different factors, such as the transmitter and receiver antenna configurations and the type of channels involved. For example, in order to enable efficient beam-forming from a Uniform Linear Array (ULA) of transmit antennas, it may be beneficial to perform the dilution process so as to retain in SCB CB₁ ⁽⁸⁾ eight column vectors that are proportional to the columns of the 8-by-8 DFT matrix, with elements

$W_{ts} = {{\exp \left( {j\frac{\pi}{4}{ts}} \right)}/8}$

(where t,s=0,1, . . . ,7) As yet another example, the SCB can be diluted by removing precoding matrices that cause considerable computational complexity. For example, matrices containing the 8-PSK elements proportional to {±1±j} can be removed, leaving only the simpler QPSK alphabet. Further additionally or alternatively, the SCBs can be diluted in any other suitable manner.

When constructing the full-rank SCB CB₈ ⁽⁸⁾ according to Equation 3 above, the full-rank SCB comprises 2·2·16=64 precoding matrices. In some embodiments, a larger-size full-rank SCB can be produced by extending CB₂ ⁽²⁾ and/or CB₄ ⁽⁴⁾ before producing CB₈ ⁽⁸⁾. The extension should typically meet the constant modulus and constrained alphabet properties described above, but the additional matrices need not necessarily be generated using Kronecker products. For example, the CB₂ ⁽²⁾ SCB can be extended by adding one or both of the matrices in the set

$\begin{matrix} {{\delta \; {CB}_{2}^{(2)}} = \begin{Bmatrix} {\frac{1}{2}\begin{bmatrix} 1 & 1 \\ \frac{1 + j}{\sqrt{2}} & {- \frac{1 + j}{\sqrt{2}}} \end{bmatrix}} \\ {,{\frac{1}{2}\begin{bmatrix} 1 & 1 \\ \frac{1 - j}{\sqrt{2}} & {- \frac{1 - j}{\sqrt{2}}} \end{bmatrix}}} \end{Bmatrix}} & {{Equation}\mspace{14mu} 7} \end{matrix}$

(or possibly-weighted permutations of these matrices). If the CB₂ ⁽²⁾ SCB is extended by these two matrices, the resulting CB₈ ⁽⁸⁾ SCB has 128 precoding matrices.

Additionally or alternatively, the CB₄ ⁽⁴⁾ SCB can be extended with additional unitary 8-PSK 4-by-4 matrices, for example matrices generated by adding Householder transformations with additional 8-PSK unit vectors. Householder-based codebooks are described, for example, in “Codebook Design for E-UTRA MIMO Pre-coding,” 3GPP RAN WG1 document R1-062650, Seoul, Korea, Oct. 9-13, 2006, which is incorporated herein by reference. As another example, the CB₄ ⁽⁴⁾ SCB can be extended by adding precoding matrices that are proportional to the 4-by-4 DFT matrix, with elements

${W_{ts} = {{\exp \left( {j\frac{\pi}{2}{ts}} \right)}/4}},$

and/or its rotated version

$W_{ts} = {{\exp \left( {j\frac{\pi}{2}{t\left( {s + \frac{1}{2}} \right)}} \right)}/4.}$

Some possible extensions of the CB₂ ⁽²⁾ SCB do not meet the constant modulus and/or constrained alphabet properties, but may nevertheless be useful (e.g., in some correlated channel scenarios). For example, the 2-by-2 identity matrix I₂ can be added to the CB₂ ⁽²⁾ SCB. This extension violates the constant modulus property in the resulting CB₈ ⁽⁸⁾ SCB. On the other hand, the resulting CB₈ ⁽⁸⁾ SCB enables reduced computational complexity because its matrices contain a relatively large number of zeros. As another example that violates the constant modulus and/or constrained alphabet properties, the CB₄ ⁽⁴⁾ SCB can be extended with unitary matrices (up to a scaling factor) that are generated from the 0-extended 8-PSK alphabet

$\left\{ {0,{\pm 1},{\pm j},\frac{{\pm 1} \pm j}{\sqrt{2}}} \right\}.$

Further additionally or alternatively, the CB₂ ⁽²⁾ and CB₄ ⁽⁴⁾ SCBs can be extended in any other suitable way before generating the CB₈ ⁽⁸⁾ SCB.

FIG. 3 is a flow chart that schematically illustrates a method for generating precoding codebooks in accordance with an embodiment of the disclosure. In the example seen, precoding codebooks for eight transmit antenna ports are generated using precoding matrices defined for two and four transmit antenna ports. Generation of precoding codebooks for different numbers of antenna ports using different combinations of precoding matrices, in accordance with an embodiment of the present disclosure, are contemplated. In some embodiments, the method is carried out by module 60 in transmitter 20. In alternative embodiments, the method is carried out in advance, using any suitable computer, and the resulting codebook is provided to transmitter 20.

The method of FIG. 3 begins at an input operation 80, in which the full-rank CB₂ ⁽²⁾ and CB₄ ⁽⁴⁾ SCBs are accepted. In the illustrative example, at a full-rank generation operation 84, the full-rank CB₈ ⁽⁸⁾ SCB is generated from the CB₂ ⁽²⁾ and CB₄ ⁽⁴⁾ SCBs, using the process of Equation 3 above. Each precoding matrix in the CB₈ ⁽⁸⁾ SCB is produced by computing a Kronecker product between a matrix selected from the CB₂ ⁽²⁾ SCB and a matrix selected from the CB₄ ⁽⁴⁾ SCB.

At a lower-rank generation operation 88, the lower-rank SCBs CB_(r) ⁽⁸⁾, r<8, are derived from the full-rank SCB CB₈ ⁽⁸⁾. In some embodiments, the resulting SCBs are diluted, at a dilution operation 92. As noted above, the SCBs can be extended with additional matrices that are not necessarily generated using Kronecker products.

Thus, in the example, the output of the method of FIG. 3 is a 8Tx codebook, which comprises SCBs for the different ranks r=1 . . . 8, i.e.,

${CB}^{(8)} = {\overset{8}{\bigcup\limits_{r = 1}}{{CB}_{r}^{(8)}.}}$

FIG. 4 is a flow chart that schematically illustrates an example method for precoding in a transmitter having eight antenna ports using precoding matrices defined for two and four transmit antenna ports, in accordance with an embodiment of the present disclosure. The method begins at a feedback operation 100, with transmitter 20 receiving feedback from the receiver. The feedback is indicative of a certain 8Tx precoding matrix in the CB⁽⁸⁾ codebook that is suitable for the receiver.

At a selection operation 104, module 60 in the transmitter selects the appropriate precoding matrix based on the feedback. Module 60 then computes this matrix based on 2Tx codebook 68 and 4Tx codebook 72 that are stored in memory 64 (FIG. 1). At a retrieval operation 108, module 60 retrieves the appropriate 2Tx and 4Tx precoding matrices whose Kronecker product will produce the desired 8Tx precoding matrix. At a computation operation 112, module 60 computes the desired 8Tx precoding matrix from the retrieved 2Tx and 4Tx precoding matrices. The computation is based, for example, on Equation 3 above. Module 60 then configures precoder 40 with the resulting 8Tx precoding matrix.

At a precoding operation 116, precoder 40 precodes the r spatial layers for transmission using the selected 8Tx precoding matrix. At a transmission operation 120, transmitter 20 transmits the precoded spatial layers over Tx antenna port 52 to the receiver.

Note that when using the method of FIG. 4, transmitter 20 does not need to store the 8Tx codebook CB⁽⁸⁾ in memory, but only the lower-dimension 2Tx and 4Tx codebooks. As a result, memory requirements in the transmitter can be reduced considerably.

In some embodiments, the transmitter does not apply the precoding matrix requested by the receiver as-is. Instead, the transmitter uses the requested matrix along with additional considerations to select a precoding scheme (e.g., precoding matrix) for precoding the downlink transmission. These additional considerations are not necessarily known to the receiver. For example, the precoding scheme may consider the impact or interference caused to other receivers as a result of precoding, and/or the interference caused to the receiver as a result of transmission on the same time-frequency resources to other receivers. Another example is the case of joint transmission from a set of cooperating transmitters to the same receiver, where the precoding employed in each of them is selected in a coordinated manner. In these embodiments, the precoding matrix that is finally applied by the transmitter need not necessarily be selected from a codebook. Thus, the disclosed techniques are also suitable for use in precoding schemes that are not codebook-based.

In the embodiments described herein, the maximum number of spatial layers used by the transmitter is equal to the number of transmit antenna ports—N_(T). In alternative embodiments, the transmitter may use a maximum number of layers (denoted R1) that is smaller than N_(T). For example, the transmitter may have eight Tx antenna ports, and may be able to precode up to six spatial layers. In these embodiments, the transmitter may generate only the relevant part of the codebook, in the present example only

$\overset{6}{\bigcup\limits_{r = 1}}{{CB}_{r}^{(8)}.}$

Precoding matrices that are produced using Kronecker products suitable, for example, for use in transmitters having cross-polarized antenna configurations. For example, when using eight transmit antennas arranged in a linear array of four cross-polarized pairs, the 2-by-2 precoding matrix in the Kronecker product may be associated with “rotations” in the two-dimensional polarization space, whereas its companion 4-by-4 precoding matrix may be associated with the preferred precoding in any given fixed polarization. In this case, in order to enable efficient beam-forming from this antenna configuration, it may be beneficial to perform the dilution process so as to retain in the lower rank SCBs matrices whose columns are proportional to vectors v of the form vεCB₁ ⁽²⁾{circle around (×)}u_(s) ^((g))

$\left( {{{{where}\mspace{14mu} \left( u_{s}^{(g)} \right)_{t}} = {{{\exp \left( {j\frac{\pi}{2}{t\left( {s + \frac{g}{2}} \right)}} \right)}/4}\mspace{14mu} t}},{s = 0},1,2,3,{g = 0},1} \right),$

namely the Kronecker product of a vector in CB₁ ⁽²⁾ by a column of the (rotated) 4-by-4 DFT matrix. (The equation above uses an indexing convention where the antenna elements of one of the linear arrays are numbered 0 . . . 3, and the elements of the second array are numbered 4 . . . 7. Alternatively, any other suitable indexing scheme or convention can also be used. Other indexing conventions may involve reordering of the precoding vector elements, or in general reordering of the rows of the precoding matrices.) Nevertheless, the disclosed techniques are not limited to any particular antenna arrangement and can be used with any suitable antenna configuration. In alternative embodiments, the precoding matrices in the SCB can be selected to match any desired geometrical configuration of the transmit antennas.

Although the embodiments described herein refer mainly to generation of precoding matrices using Kronecker products of two square matrices, the principles of the present invention can be used in any other suitable manner to produce precoding matrices for N_(T) antenna ports from precoding matrices that are defined for smaller numbers of antenna ports. For example, one may consider generating a precoding matrix W in CB_(r) ⁽⁸⁾ by concatenating (i.e., combining the columns of) several matrices W_(k)εCB_(s) _(k) ⁽²⁾{circle around (×)}CB_(t) _(k) ⁽⁴⁾ where the relation

${\sum\limits_{k}^{\;}\; {s_{k}t_{k}}} = r$

holds. As another example, one may consider generating a precoding matrix W in CB₈ ⁽⁸⁾ as a triple Kronecker product of the form WεCB₂ ⁽²⁾{circle around (×)}CB₂ ⁽²⁾{circle around (×)}CB₂ ⁽²⁾.

It is noted that the embodiments described above are cited by way of example, and that the present invention is not limited to what has been particularly shown and described hereinabove. Rather, the scope of the present invention includes both combinations and sub-combinations of the various features described hereinabove, as well as variations and modifications thereof which would occur to persons skilled in the art upon reading the foregoing description and which are not disclosed in the prior art. 

1. A method for communication, comprising: configuring a communication system that includes a transmitter and a receiver with a first codebook of first matrices for mapping up to N data streams onto N transmit antenna ports of the transmitter, each of at least some of the first matrices derived from second matrices, at least some of which are drawn from a second codebook for mapping data onto a number of transmit antenna ports that is less than N; mapping the data streams onto the N transmit antenna ports using a mapping scheme based on one of the first matrices; and transmitting the mapped data streams over the N transmit antenna ports from the transmitter to the receiver.
 2. The method according to claim 1, wherein configuring the communication system comprises including a candidate matrix in the first codebook responsively to verifying that the candidate matrix cannot be expressed as a weighted permutation of the columns of another matrix in the first codebook.
 3. The method according to claim 1, wherein configuring the communication system comprises including a candidate matrix in the first codebook responsively to verifying that respective distances between the candidate matrix and the other matrices in the first codebook, measured in accordance with a given distance metric, exceed a given threshold.
 4. The method according to claim 1, wherein configuring the communication system comprises selecting the matrices in the first codebook to match a geometrical configuration of transmit antennas of the transmitter.
 5. The method according to claim 4, wherein selecting the matrices in the first codebook comprises choosing the matrices in the first codebook to match an array of cross-polarized transmit antennas.
 6. The method according to claim 1, wherein configuring the communication system comprises storing in the communication system only the second matrices, and computing the one of the first matrices in the transmitter based on the stored second matrices.
 7. The method according to claim 1, wherein transmitting the mapped data streams comprises transmitting a signal conforming to a Long Term Evolution Advanced (LTE-A) specification.
 8. The method according to claim 1, wherein mapping the data streams comprises selecting the mapping scheme based on feedback from the receiver.
 9. The method according to claim 1, wherein N=8.
 10. The method according to claim 1, wherein N=4.
 11. A communication apparatus, comprising: N transmit antenna ports; and a transmitter, which is configured to accept a definition of a first codebook of first matrices for mapping up to N data streams onto N transmit antenna ports of the transmitter, each of at least some of the first matrices derived from second matrices, at least some of which are drawn from a second codebook for mapping data onto a number of transmit antenna ports that is less than N, to map the data streams onto the N transmit antenna ports using a mapping scheme based on one of the first matrices, and to transmit the mapped data streams over the N transmit antenna ports to a receiver.
 12. The communication apparatus according to claim 11, wherein the transmitter is configured to include a candidate matrix in the first codebook responsively to verifying that the candidate matrix cannot be expressed as a weighted permutation of the columns of another matrix in the first codebook.
 13. The communication apparatus according to claim 11, wherein the transmitter is configured to include a candidate matrix in the first codebook responsively to verifying that respective distances between the candidate matrix and the other matrices in the first codebook, measured in accordance with a given distance metric, exceed a given threshold.
 14. The communication apparatus according to claim 11, wherein the transmitter is configured to select the matrices in the first codebook to match a geometrical configuration of transmit antennas of the transmitter.
 15. The communication apparatus according to claim 14, wherein the transmitter is configured to choose the matrices in the first codebook to match an array of cross-polarized transmit antennas.
 16. The communication apparatus according to claim 11, wherein the transmitter is configured to store in a memory only the second matrices, and to compute the one of the first matrices in the transmitter based on the stored second matrices.
 17. The communication apparatus according to claim 11, wherein N=8.
 18. The communication apparatus according to claim 11, wherein N=4.
 19. A mobile communication terminal comprising the communication apparatus of claim
 11. 20. A chipset for processing signals in a mobile communication terminal, comprising the communication apparatus of claim
 11. 